A classification of smooth embeddings of 3-manifolds in 6-space
Abstract
We work in the smooth category. If there are knotted embeddings Sn Rm, which often happens for 2m<3n+4, then no concrete complete description of embeddings of n-manifolds into Rm up to isotopy was known, except for disjoint unions of spheres. Let N be a closed connected orientable 3-manifold. Our main result is the following description of the set Emb6(N) of embeddings N R6 up to isotopy. The Whitney invariant W : Emb6(N) H1(N;Z) is surjective. For each u ∈ H1(N;Z) the Kreck invariant ηu : W-1u Zd(u) is bijective, where d(u) is the divisibility of the projection of u to the free part of H1(N;Z). The group Emb6(S3) is isomorphic to Z (Haefliger). This group acts on Emb6(N) by embedded connected sum. It was proved that the orbit space of this action maps under W bijectively to H1(N;Z) (by Vrabec and Haefliger's smoothing theory). The new part of our classification result is determination of the orbits of the action. E. g. for N=RP3 the action is free, while for N=S1× S2 we construct explicitly an embedding f : N R6 such that for each knot l:S3 R6 the embedding f#l is isotopic to f. Our proof uses new approaches involving the Kreck modified surgery theory or the Boechat-Haefliger formula for smoothing obstruction.
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